On Iterative Methods for Solving Nonlinear Equations in Quantum Calculus

Quantum calculus (also known as the q-calculus) is a technique that is similar to traditional calculus, but focuses on the concept of deriving q-analogous results without the use of the limits. In this paper, we suggest and analyze some new q-iterative methods by using the q-analogue of the Taylor's series and the coupled system technique. In the domain of q-calculus, we determine the convergence of our proposed q-algorithms. Numerical examples demonstrate that the new q-iterative methods can generate solutions to the nonlinear equations with acceptable accuracy. These newly established methods also exhibit predictability. Furthermore, an analogy is settled between the well known classical methods and our proposed q-Iterative methods.

Automated summary

The paper explores the concept of quantum calculus, proposing new q-iterative methods for solving equations and demonstrating their convergence and accuracy through numerical examples. It also establishes an analogy between classical methods and the newly proposed q-iterative methods.